To solve this problem, we apply the principles of fluid dynamics, specifically the continuity equation and Bernoulli's equation.
Using the Continuity Equation:
The continuity equation for fluid flow states that the product of the cross-sectional area of the pipe and the fluid velocity must remain constant:
A1V1=A2V2Given:
A1=10cm2=10×10−4m2V1=1m∕ sA2=5cm2=5×10−4m2Solving for
V2 :
V2===2m∕ s Applying Bernoulli's Equation:
Bernoulli's equation for steady, incompressible flow along a streamline is:
P1+ρV12=P2+ρV22 Where:
P1=2000Paρ=1000kg∕m3 (density of water) Rearranging to find
P2 : P2=P1+ρ(V12−V22) Substituting the known values:
P2=2000+×1000×(12−22)P2=2000+×1000×(1−4)P2=2000+500×(−3)=2000−1500=500PaThus, the pressure of the water at the second point in the pipe is 500 Pa .